The Thompson-Higman monoids Mk,i: the J-order, the D-relation, and their complexity

Abstract

The Thompson-Higman groups Gk,i have a natural generalization to monoids Mk,i, and inverse monoids Invk,i. We study some structural features of Mk,i and Invk,i and investigate the computational complexity of decision problems. The main interest of these monoids is their close connection with circuits and circuit complexity. The maximal subgroups of Mk,1 are isomorphic to the groups Gk,j (1 ≤ j ≤ k-1); so we rediscover all the Thompson-Higman groups within Mk,1. The Green relations ≤J and D of Mk,1 can be decided in deterministic polynomial time when the inputs are words over a finite generating set of Mk,1. When a circuit-like generating set is used for Mk,1 then deciding ≤J is coDP-complete. The multiplier search problem for ≤J is xNPsearch-complete, whereas the multiplier search problems of ≤R and ≤L are not in xNPsearch unless NP = coNP. Deciding D for Mk,1 when the inputs are words over a circuit-like generating set, is k-1.NP-complete. For Invk,1 over a circuit-like generating set, deciding D is k-1 P-complete.